Question:

Find the value of n such that $^{n}P_{5} = 42\, ^{n}P_{3} , n > 4$.

Updated On: Jul 6, 2022
  • $10$
  • $15$
  • $12$
  • $20$
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The Correct Option is A

Solution and Explanation

We have $^{n}P_{5} = 42 ^{n}P_{3} $ $ \Rightarrow n\left(n - 1\right) \left(n - 2\right) \left(n - 3\right) \left(n - 4\right) = 42 n\left(n - 1\right) \left(n - 2\right) $ $\Rightarrow \left(n-3\right)\left(n-4\right)= 42$ [Since $n > 4$, so $n\left(n-1\right)\left(n-2\right) \ne0$] $\Rightarrow n^{2} - 7n - 30 = 0$ $\Rightarrow n^{2} - 10n + 3n - 30 = 0$ $ \Rightarrow n= 10$ or $n= -3 $ As n cannot be negative, so $n = 10 $
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Notes on permutations and combinations

Concepts Used:

Permutations and Combinations

Permutation:

Permutation is the method or the act of arranging members of a set into an order or a sequence. 

  • In the process of rearranging the numbers, subsets of sets are created to determine all possible arrangement sequences of a single data point. 
  • A permutation is used in many events of daily life. It is used for a list of data where the data order matters.

Combination:

Combination is the method of forming subsets by selecting data from a larger set in a way that the selection order does not matter.

  • Combination refers to the combination of about n things taken k at a time without any repetition.
  • The combination is used for a group of data where the order of data does not matter.